Ergodic decomposition of quasi-invariant probability measures

Gernot Greschonig; Klaus Schmidt

doi:10.4064/cm-84/85-2-495-514

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Ergodic decomposition of quasi-invariant probability measures

Gernot Greschonig Klaus Schmidt

Year: 2000 Journal: Colloquium Mathematicum Vol: 84 (2)Pages: 495-514 Publisher: Polish Academy of Sciences

DOI: 10.4064/cm-84/85-2-495-514

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Abstract

The purpose of this note is to prove various versions of the ergodic decomposition theorem for probability measures on standard Borel spaces which are quasi-invariant under a Borel action of a locally compact second countable group or a discrete nonsingul

Keywords:

Mathematics Ergodic theory Countable set Invariant (physics) Pure mathematics Invariant measure Probability measure Amenable group Second-countable space Decomposition Decomposition theorem Discrete mathematics Mathematical physics

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Advanced Operator Algebra Research

Physical Sciences → Mathematics → Mathematical Physics

Advanced Banach Space Theory

Physical Sciences → Mathematics → Mathematical Physics

Advanced Topology and Set Theory

Physical Sciences → Mathematics → Geometry and Topology

Ergodic decomposition of quasi-invariant probability measures

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